Uniqueness in Law for a Class of Degenerate Diffusions with Continuous Covariance

Abstract

We study the martingale problem associated with the operator L u = ∂s u + 1/2 Σi,j=1d0 aij ∂ij u + Σi,j=1d Bij xj ∂i u, where d0 ≤ d. We show that the martingale problem is well-posed when the function a is continuous and strictly positive-definite on Rd0 and the matrix B takes a particular lower-diagonal, block form. We then localize this result to show that the martingale problem remains well-posed when B is replaced by a sufficiently smooth vector field whose Jacobian matrix satisfies a nondegeneracy condition.